1) finite order meromorphic function
有限级亚纯函数
2) meromorphic functions of finite order
有穷级亚纯函数
1.
Based on the Nevanlinna second fundamental theorem and the theorems for meromorphic functions of order,this paper discussed the unicity theorems for meromorphic functions of finite order and obtained the three results concerning the multiplicity,which generalized and improved some results obtained by Lv Weiran,Lin Weichuan etc.
应用Nevanlinna第二基本定理、亚纯函数级的性质,讨论了有穷级亚纯函数唯一性,在涉及重级的情况下得到了三个定理,所得的结论推广并改进了吕巍然、林伟川等人的一些结果。
3) meromorphic functions of finite and positive order
有穷正级亚纯函数
4) meromorphic function of finite lower order
有穷下级亚纯函数
5) Meromorphic function
亚纯函数
1.
On an uniqueness of meromorphic functions sharing two finite sets;
关于分担两个集合的亚纯函数的唯一性
2.
Uniqueness of meromorphic functions concerning weakly weighted-sharing small functions;
涉及权弱分担小函数的亚纯函数唯一性
3.
Uniqueness theorem of meromorphic functions sharing one value;
权分担一个值的亚纯函数的唯一性定理
6) meromorphic
[,merə'mɔ:fik]
亚纯函数
1.
The problem of uniqueness of meromorphic functions is discussed.
讨论了亚纯函数的惟一性问题,证明存在一个具有12个元素的集合S使得对任意2个非常数的亚纯函数f与g,只要满足3)(S,f)=3)(S,g)和({∞},f)=({∞},g),必有f≡g。
2.
We will give reduce demonstration for a lemma in four values theorem of meromorphic function.
给出了亚纯函数四值定理中一个引理的简化证明。
3.
In this paper we get the following results: Let (z) be a meromorphic function in domain G which is not identically zero, a1(z), a2(z), …,ak(z) be holomorphic function in domain G, F={f} be a family of meromorphic functions in G.
本文获得如下结果:设(z)为区域G内一不恒为零的亚纯函数,a1(z),a2(z),…,ak(z)为区域G内的全纯函数,F={f}为G内一亚纯函数族。
补充资料:亚纯函数
